AbstractWe derive a class of two-level high-order implicit finite difference schemes for solving three-dimensional parabolic problems with mixed derivatives. The schemes are fourth-order accurate in space and second- or lower-order accurate in time depending on the choice of a weighted average parameter μ. Numerical results with μ=0.5 are presented to confirm the high accuracy of the derived scheme and to compare it with the standard second-order central difference scheme. It is shown that the improvement in accuracy does not come at a higher cost of computation and storage since it is possible to choose the grid parameters so that the present scheme requires less work and memory and gives more accuracy than the standard central difference ...
AbstractIn this paper we present and analyze new methods to integrate multidimensional parabolic pro...
AbstractA nonlinear finite difference scheme with high accuracy is studied for a class of two-dimens...
AbstractThis paper proposes a new numerical method based on an implicit difference scheme and the Fo...
We derive a class of two-level high-order implicit finite difference schemes for solving three-dimen...
AbstractWe derive a class of two-level high-order implicit finite difference schemes for solving thr...
We present a high-order compact finite difference approach for a rather general class of parabolic p...
AbstractAn alternating-direction implicit method for N-dimensional parabolic equations with mixed de...
AbstractWe propose a new two-level implicit difference method of O(k2+kh2+h4) for the solution of si...
Alternating direction implicit (ADI) schemes for two-dimensional parabolic equations with a mixed de...
AbstractNonclassical parabolic initial-boundary value problems arise in the study of several importa...
We introduce a class of alternating direction implicit (ADI) methods, based on approximate factoriza...
These lecture notes are designed for a one-semester course on finite-difference methods for paraboli...
AbstractIn this article, two-level implicit difference methods of O(k2 + h4) using 19-spatial grid p...
This paper introduces alternating-direction implicit (ADI) solvers of higher order of time-accuracy ...
We present a novel implicit scheme for the numerical solution of time-dependent conservation laws. T...
AbstractIn this paper we present and analyze new methods to integrate multidimensional parabolic pro...
AbstractA nonlinear finite difference scheme with high accuracy is studied for a class of two-dimens...
AbstractThis paper proposes a new numerical method based on an implicit difference scheme and the Fo...
We derive a class of two-level high-order implicit finite difference schemes for solving three-dimen...
AbstractWe derive a class of two-level high-order implicit finite difference schemes for solving thr...
We present a high-order compact finite difference approach for a rather general class of parabolic p...
AbstractAn alternating-direction implicit method for N-dimensional parabolic equations with mixed de...
AbstractWe propose a new two-level implicit difference method of O(k2+kh2+h4) for the solution of si...
Alternating direction implicit (ADI) schemes for two-dimensional parabolic equations with a mixed de...
AbstractNonclassical parabolic initial-boundary value problems arise in the study of several importa...
We introduce a class of alternating direction implicit (ADI) methods, based on approximate factoriza...
These lecture notes are designed for a one-semester course on finite-difference methods for paraboli...
AbstractIn this article, two-level implicit difference methods of O(k2 + h4) using 19-spatial grid p...
This paper introduces alternating-direction implicit (ADI) solvers of higher order of time-accuracy ...
We present a novel implicit scheme for the numerical solution of time-dependent conservation laws. T...
AbstractIn this paper we present and analyze new methods to integrate multidimensional parabolic pro...
AbstractA nonlinear finite difference scheme with high accuracy is studied for a class of two-dimens...
AbstractThis paper proposes a new numerical method based on an implicit difference scheme and the Fo...